Y-systems and generalized associahedra

The goals of this paper are two-fold. First, we prove, for an arbitrary finite root system D, the periodicity conjecture of Al. B. Zamolodchikov [24] that concerns Y-systems, a particular class of functional relations playing an important role in the theory of thermodynamic Bethe ansatz. Algebraically, Y-systems can be viewed as families of rational functions defined by certain birational recurrences formulated in terms of the root system (. We obtain explicit formulas for these rational functions, which always turn out to be Laurent polynomials, and prove that they exhibit the periodicity property conjectured by Zamolodchikov. In a closely related development, we introduce and study a simplicial complex A(b), which can be viewed as a generalization of the Stasheff polytope (also known as associahedron) for an arbitrary root system (D. In type A, this complex is the face complex of the ordinary associahedron, whereas in type B, our construction produces the Bott-Taubes polytope, or cyclohedron. We enumerate the faces of the complex A(@), prove that its geometric realization is always a sphere, and describe it in concrete combinatorial terms for the classical types ABCD. The primary motivation for this investigation came from the theory of cluster algebras, introduced in [9] as a device for studying dual canonical bases and total positivity in semisimple Lie groups. This connection remains behind the scenes in the text of this paper, and will be brought to light in a forthcoming sequel1 to [9].

[1]  Jim Stasheff,et al.  Homotopy associativity of $H$-spaces. II , 1963 .

[2]  P. M. Cohn GROUPES ET ALGÉBRES DE LIE , 1977 .

[3]  RICHARD P. STANLEY,et al.  On the Number of Reduced Decompositions of Elements of Coxeter Groups , 1984, Eur. J. Comb..

[4]  J. Hofbauer,et al.  q-Catalan Numbers , 1985, J. Comb. Theory, Ser. A.

[5]  Carl W. Lee,et al.  The Associahedron and Triangulations of the n-gon , 1989, Eur. J. Comb..

[6]  Spectra in conformal field theories from the Rogers dilogarithm , 1992, hep-th/9206034.

[7]  Raoul Bott,et al.  On the self‐linking of knots , 1994 .

[8]  FUNCTIONAL RELATIONS IN SOLVABLE LATTICE MODELS I: FUNCTIONAL RELATIONS AND REPRESENTATION THEORY , 1993, hep-th/9309137.

[9]  I. M. Gelʹfand,et al.  Discriminants, Resultants, and Multidimensional Determinants , 1994 .

[10]  G. Ziegler Lectures on Polytopes , 1994 .

[11]  FUNCTIONAL RELATIONS IN SOLVABLE LATTICE MODELS II: APPLICATIONS , 1993, hep-th/9310060.

[12]  Thermodynamic Bethe Ansatz and Dilogarithm Identities I , 1995, hep-th/9506215.

[13]  F. Gliozzi,et al.  THERMODYNAMIC BETHE ANSATZ AND THREE-FOLD TRIANGULATIONS , 1996 .

[14]  S. Fomin,et al.  Parametrizations of Canonical Bases and Totally Positive Matrices , 1996 .

[15]  Simplex, associahedron, and cyclohedron , 1997, alg-geom/9707009.

[16]  Victor Reiner,et al.  Non-crossing partitions for classical reflection groups , 1997, Discret. Math..

[17]  Jian-Yi Shi,et al.  THE NUMBER OF ⊕-SIGN TYPES , 1997 .

[18]  Christos A. Athanasiadis On Noncrossing and Nonnesting Partitions for Classical Reflection Groups , 1998, Electron. J. Comb..

[19]  N. Bourbaki Lie groups and Lie algebras , 1998 .

[20]  Andrei Zelevinsky,et al.  Tensor product multiplicities, canonical bases and totally positive varieties , 1999, math/9912012.

[21]  Sergey Fomin,et al.  Total positivity : tests and parametrizations , 2018 .

[22]  A TOPOLOGICAL INVARIANT OF RG FLOWS IN 2D INTEGRABLE QUANTUM FIELD THEORIES , 1999, hep-th/9902094.

[23]  P. Sorba,et al.  Dictionary on lie algebras and superalgebras , 2000 .

[24]  Rodica Simion,et al.  Noncrossing partitions , 2000, Discret. Math..

[25]  David Bessis The dual braid monoid , 2001 .

[26]  M. Laczkovich,et al.  Some Periodic and Non-Periodic Recursions , 2001 .

[27]  Explicit Presentations for the Dual Braid Monoids , 2001, math/0111280.

[28]  S. Fomin,et al.  Cluster algebras I: Foundations , 2001, math/0104151.

[29]  Ad-nilpotent ideals of a Borel subalgebra II , 2001, math/0303065.

[30]  Sergey Fomin,et al.  Polytopal Realizations of Generalized Associahedra , 2002, Canadian Mathematical Bulletin.

[31]  Sergey Fomin,et al.  The Laurent Phenomenon , 2002, Adv. Appl. Math..

[32]  AI. B. Zamolodch On the thermodynamic Bethe ansatz equations for reflectionless ADE scattering theories , 2002 .

[33]  Satyan L. Devadoss A Space of Cyclohedra , 2001, Discret. Comput. Geom..

[34]  Rodica Simion,et al.  A type-B associahedron , 2003, Adv. Appl. Math..

[35]  Cluster algebras: Notes for the CDM-03 conference , 2003, math/0311493.

[36]  Victor Reiner,et al.  Noncrossing Partitions for the Group Dn , 2005, SIAM J. Discret. Math..

[37]  Christos A. Athanasiadis,et al.  Generalized Catalan Numbers, Weyl Groups and Arrangements of Hyperplanes , 2004 .